%% Input file name: estimacion/estimadores_consistentes.fig
%% FIG version: 3.2
%% Orientation: Landscape
%% Justification: Flush Left
%% Units: Inches
%% Paper size: Letter
%% Magnification: 100.0
%% Resolution: 1200ppi

\begin{pspicture}(5.97cm,3.71cm)(16.34cm,13.69cm)
\psset{unit=0.8cm}
%%
%% Depth: 2147483647
%%
\newrgbcolor{mycolor0}{1.00 0.50 0.31}\definecolor{mycolor0}{rgb}{1.00,0.50,0.31}
\newrgbcolor{mycolor2}{0.28 0.46 1.00}\definecolor{mycolor2}{rgb}{0.28,0.46,1.00}
\newgray{mycolor3}{0.74}\definecolor{mycolor3}{gray}{0.74}
%%
%% Depth: 100
%%
\psset{linestyle=solid,linewidth=0.03175,linecolor=mycolor0,fillstyle=none}
\psline(9.73,7.19)(9.79,7.20)(9.85,7.21)(9.92,7.22)(9.98,7.23)(10.04,7.24)(10.10,7.26)(10.17,7.27)(10.23,7.28)(10.29,7.30)(10.35,7.32)(10.42,7.33)(10.48,7.35)(10.54,7.37)(10.60,7.39)(10.67,7.41)(10.73,7.43)(10.79,7.46)(10.85,7.48)(10.92,7.51)(10.98,7.53)(11.04,7.56)(11.11,7.59)(11.17,7.62)(11.23,7.66)(11.29,7.69)(11.36,7.72)(11.42,7.76)(11.48,7.80)(11.54,7.83)(11.61,7.87)(11.67,7.91)(11.73,7.96)(11.79,8.00)(11.86,8.04)(11.92,8.09)(11.98,8.13)(12.04,8.18)(12.11,8.23)(12.17,8.28)(12.23,8.32)(12.30,8.37)(12.36,8.42)(12.42,8.48)(12.48,8.52)(12.55,8.57)(12.61,8.63)(12.67,8.68)(12.73,8.72)(12.80,8.78)(12.86,8.82)(12.92,8.87)(12.98,8.92)(13.05,8.97)(13.11,9.01)(13.17,9.06)(13.23,9.10)(13.30,9.14)(13.36,9.19)(13.42,9.22)(13.49,9.26)(13.55,9.30)(13.61,9.33)(13.67,9.36)(13.74,9.39)(13.80,9.42)(13.86,9.44)(13.92,9.46)(13.98,9.48)(14.05,9.50)(14.11,9.51)(14.17,9.53)(14.24,9.53)(14.30,9.54)(14.36,9.54)(14.42,9.54)(14.49,9.54)(14.55,9.53)(14.61,9.53)(14.67,9.51)(14.74,9.50)(14.80,9.48)(14.86,9.46)(14.92,9.44)(14.99,9.42)(15.05,9.39)(15.11,9.36)(15.17,9.33)(15.24,9.30)(15.30,9.26)(15.36,9.22)(15.43,9.19)(15.49,9.14)(15.55,9.10)(15.61,9.06)(15.68,9.01)(15.74,8.97)(15.80,8.92)(15.86,8.87)(15.93,8.82)(15.99,8.78)(16.05,8.72)(16.11,8.68)(16.18,8.63)(16.24,8.57)(16.30,8.52)(16.36,8.48)(16.43,8.42)(16.49,8.37)(16.55,8.32)(16.62,8.28)(16.68,8.23)(16.74,8.18)(16.80,8.13)(16.87,8.09)(16.93,8.04)(16.99,8.00)(17.05,7.96)(17.12,7.91)(17.18,7.87)(17.24,7.83)(17.30,7.80)(17.37,7.76)(17.43,7.72)(17.49,7.69)(17.55,7.66)(17.62,7.62)(17.68,7.59)(17.74,7.56)(17.81,7.53)(17.87,7.51)(17.93,7.48)(17.99,7.46)(18.06,7.43)(18.12,7.41)(18.18,7.39)(18.24,7.37)(18.30,7.35)(18.37,7.33)(18.43,7.32)(18.49,7.30)(18.56,7.28)(18.62,7.27)(18.68,7.26)(18.74,7.24)(18.81,7.23)(18.87,7.22)(18.93,7.21)(18.99,7.20)(19.06,7.19)
\psset{linecolor=black}
\psline(9.36,7.09)(9.36,14.86)
\psline(9.36,7.09)(9.14,7.09)
\psline(9.36,9.03)(9.14,9.03)
\psline(9.36,10.97)(9.14,10.97)
\psline(9.36,12.92)(9.14,12.92)
\psline(9.36,14.86)(9.14,14.86)
\rput[B]{90}(8.85,7.09){0.0}
\rput[B]{90}(8.85,9.03){0.1}
\rput[B]{90}(8.85,10.97){0.2}
\rput[B]{90}(8.85,12.92){0.3}
\rput[B]{90}(8.85,14.86){0.4}
\psline(9.36,6.77)(19.43,6.77)(19.43,15.57)(9.36,15.57)(9.36,6.77)
\rput[B](14.39,16.29){Distribuciones de estimadores consistentes}
\rput[B](14.39,5.16){Valores de los estimadores}
\rput[lB]{90}(7.98,9.84){Densidad $f(x)$}
\psset{linecolor=green}
\psline(9.73,7.09)(9.79,7.09)(9.85,7.09)(9.92,7.09)(9.98,7.09)(10.04,7.09)(10.10,7.09)(10.17,7.09)(10.23,7.09)(10.29,7.09)(10.35,7.09)(10.42,7.09)(10.48,7.09)(10.54,7.09)(10.60,7.09)(10.67,7.09)(10.73,7.09)(10.79,7.09)(10.85,7.09)(10.92,7.09)(10.98,7.09)(11.04,7.09)(11.11,7.10)(11.17,7.10)(11.23,7.10)(11.29,7.10)(11.36,7.10)(11.42,7.10)(11.48,7.10)(11.54,7.11)(11.61,7.11)(11.67,7.12)(11.73,7.12)(11.79,7.13)(11.86,7.14)(11.92,7.15)(11.98,7.17)(12.04,7.19)(12.11,7.21)(12.17,7.24)(12.23,7.27)(12.30,7.31)(12.36,7.35)(12.42,7.41)(12.48,7.47)(12.55,7.54)(12.61,7.62)(12.67,7.71)(12.73,7.81)(12.80,7.93)(12.86,8.06)(12.92,8.21)(12.98,8.37)(13.05,8.54)(13.11,8.72)(13.17,8.92)(13.23,9.13)(13.30,9.36)(13.36,9.59)(13.42,9.83)(13.49,10.08)(13.55,10.33)(13.61,10.58)(13.67,10.83)(13.74,11.08)(13.80,11.31)(13.86,11.54)(13.92,11.75)(13.98,11.94)(14.05,12.11)(14.11,12.26)(14.17,12.38)(14.24,12.47)(14.30,12.53)(14.36,12.56)(14.42,12.56)(14.49,12.53)(14.55,12.47)(14.61,12.38)(14.67,12.26)(14.74,12.11)(14.80,11.94)(14.86,11.75)(14.92,11.54)(14.99,11.31)(15.05,11.08)(15.11,10.83)(15.17,10.58)(15.24,10.33)(15.30,10.08)(15.36,9.83)(15.43,9.59)(15.49,9.36)(15.55,9.13)(15.61,8.92)(15.68,8.72)(15.74,8.54)(15.80,8.37)(15.86,8.21)(15.93,8.06)(15.99,7.93)(16.05,7.81)(16.11,7.71)(16.18,7.62)(16.24,7.54)(16.30,7.47)(16.36,7.41)(16.43,7.35)(16.49,7.31)(16.55,7.27)(16.62,7.24)(16.68,7.21)(16.74,7.19)(16.80,7.17)(16.87,7.15)(16.93,7.14)(16.99,7.13)(17.05,7.12)(17.12,7.12)(17.18,7.11)(17.24,7.11)(17.30,7.10)(17.37,7.10)(17.43,7.10)(17.49,7.10)(17.55,7.10)(17.62,7.10)(17.68,7.10)(17.74,7.09)(17.81,7.09)(17.87,7.09)(17.93,7.09)(17.99,7.09)(18.06,7.09)(18.12,7.09)(18.18,7.09)(18.24,7.09)(18.30,7.09)(18.37,7.09)(18.43,7.09)(18.49,7.09)(18.56,7.09)(18.62,7.09)(18.68,7.09)(18.74,7.09)(18.81,7.09)(18.87,7.09)(18.93,7.09)(18.99,7.09)(19.06,7.09)
\psset{linecolor=mycolor2}
\psline(9.73,7.09)(9.79,7.09)(9.85,7.09)(9.92,7.09)(9.98,7.09)(10.04,7.09)(10.10,7.09)(10.17,7.09)(10.23,7.09)(10.29,7.09)(10.35,7.09)(10.42,7.09)(10.48,7.09)(10.54,7.09)(10.60,7.09)(10.67,7.09)(10.73,7.09)(10.79,7.09)(10.85,7.09)(10.92,7.09)(10.98,7.09)(11.04,7.09)(11.11,7.09)(11.17,7.09)(11.23,7.09)(11.29,7.09)(11.36,7.09)(11.42,7.09)(11.48,7.09)(11.54,7.09)(11.61,7.09)(11.67,7.09)(11.73,7.09)(11.79,7.09)(11.86,7.09)(11.92,7.09)(11.98,7.09)(12.04,7.10)(12.11,7.10)(12.17,7.10)(12.23,7.10)(12.30,7.10)(12.36,7.11)(12.42,7.12)(12.48,7.13)(12.55,7.14)(12.61,7.16)(12.67,7.19)(12.73,7.23)(12.80,7.27)(12.86,7.34)(12.92,7.41)(12.98,7.51)(13.05,7.63)(13.11,7.78)(13.17,7.96)(13.23,8.17)(13.30,8.42)(13.36,8.70)(13.42,9.03)(13.49,9.40)(13.55,9.80)(13.61,10.24)(13.67,10.70)(13.74,11.19)(13.80,11.69)(13.86,12.20)(13.92,12.69)(13.98,13.16)(14.05,13.60)(14.11,13.98)(14.17,14.31)(14.24,14.56)(14.30,14.74)(14.36,14.83)(14.42,14.83)(14.49,14.74)(14.55,14.56)(14.61,14.31)(14.67,13.98)(14.74,13.60)(14.80,13.16)(14.86,12.69)(14.92,12.20)(14.99,11.69)(15.05,11.19)(15.11,10.70)(15.17,10.24)(15.24,9.80)(15.30,9.40)(15.36,9.03)(15.43,8.70)(15.49,8.42)(15.55,8.17)(15.61,7.96)(15.68,7.78)(15.74,7.63)(15.80,7.51)(15.86,7.41)(15.93,7.34)(15.99,7.27)(16.05,7.23)(16.11,7.19)(16.18,7.16)(16.24,7.14)(16.30,7.13)(16.36,7.12)(16.43,7.11)(16.49,7.10)(16.55,7.10)(16.62,7.10)(16.68,7.10)(16.74,7.10)(16.80,7.09)(16.87,7.09)(16.93,7.09)(16.99,7.09)(17.05,7.09)(17.12,7.09)(17.18,7.09)(17.24,7.09)(17.30,7.09)(17.37,7.09)(17.43,7.09)(17.49,7.09)(17.55,7.09)(17.62,7.09)(17.68,7.09)(17.74,7.09)(17.81,7.09)(17.87,7.09)(17.93,7.09)(17.99,7.09)(18.06,7.09)(18.12,7.09)(18.18,7.09)(18.24,7.09)(18.30,7.09)(18.37,7.09)(18.43,7.09)(18.49,7.09)(18.56,7.09)(18.62,7.09)(18.68,7.09)(18.74,7.09)(18.81,7.09)(18.87,7.09)(18.93,7.09)(18.99,7.09)(19.06,7.09)
\psset{linecolor=mycolor3}
\psline(9.36,7.09)(19.43,7.09)
\psset{linecolor=black}
\psline(14.39,6.77)(14.39,6.77)
\psline(14.39,6.77)(14.39,6.56)
\rput[lB](14.28,5.93){$\theta$}
\psset{linecolor=mycolor0}
\psline(17.04,14.82)(17.68,14.82)
\psset{linecolor=green}
\psline(17.04,14.40)(17.68,14.40)
\psset{linecolor=mycolor2}
\psline(17.04,13.98)(17.68,13.98)
\rput[lB](18.00,14.70){n=10}
\rput[lB](18.00,14.27){n=50}
\rput[lB](18.00,13.85){n=100}
\end{pspicture}
%% End
